A square is inscribed in a circle, with each corner of the square touching the circle. A larger square is circumscribed outside the circle, with each side of the larger square touching a corner of the inscribed square. The sides of the larger square are longer than the sides of the smaller square by a factor of ....?© BrainMass Inc. brainmass.com October 9, 2019, 5:05 pm ad1c9bdddf
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The diagonal of the small ...
The ratio of the lengths of two squares (one inside a circle and one outside a circle) are found. The solution is detailed and well presented. A diagram is included.